English

Inflectionary Invariants for Isolated Complete Intersection Curve Singularities

Algebraic Geometry 2020-04-01 v4

Abstract

We investigate the role played by curve singularity germs in the enumeration of inflection points in families of curves acquiring singular members. Let N2N \geq 2, and consider an isolated complete intersection curve singularity germ f ⁣:(CN,0)(CN1,0)f \colon (\mathbb{C}^N,0) \to (\mathbb{C}^{N-1},0). We introduce a numerical function mAD(2)m(f)m \mapsto \operatorname{AD}_{(2)}^m(f) that arises as an error term when counting mthm^{\mathrm{th}}-order weight-22 inflection points with ramification sequence (0,,0,2)(0, \dots, 0, 2) in a 11-parameter family of curves acquiring the singularity f=0f = 0, and we compute AD(2)m(f)\operatorname{AD}_{(2)}^m(f) for various (f,m)(f,m). Particularly, for a node defined by f ⁣:(x,y)xyf \colon (x,y) \mapsto xy, we prove that AD(2)m(xy)=(m+14),\operatorname{AD}_{(2)}^m(xy) = {{m+1} \choose 4}, and we deduce as a corollary that AD(2)m(f)(mult0Δf)(m+14)\operatorname{AD}_{(2)}^m(f) \geq (\operatorname{mult}_0 \Delta_f) \cdot {{m+1} \choose 4} for any ff, where mult0Δf\operatorname{mult}_0 \Delta_f is the multiplicity of the discriminant Δf\Delta_f at the origin in the deformation space. Furthermore, we show that the function mAD(2)m(f)(mult0Δf)(m+14)m \mapsto \operatorname{AD}_{(2)}^m(f) -(\operatorname{mult}_0 \Delta_f) \cdot {{m+1} \choose 4} is an analytic invariant measuring how much the singularity "counts as" an inflection point. We obtain similar results for weight-22 inflection points with ramification sequence (0,,0,1,1)(0, \dots, 0, 1,1) and for weight-11 inflection points, and we apply our results to solve various related enumerative problems.

Keywords

Cite

@article{arxiv.1705.08761,
  title  = {Inflectionary Invariants for Isolated Complete Intersection Curve Singularities},
  author = {Anand Patel and Ashvin Swaminathan},
  journal= {arXiv preprint arXiv:1705.08761},
  year   = {2020}
}

Comments

90 pages

R2 v1 2026-06-22T19:57:44.456Z